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Interacting particle systems and Jacobi style identities

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Interacting particle systems and Jacobi style identities. / Balázs, Márton; Fretwell, Dan; Jay, Jessica.
In: Research in the Mathematical Sciences, Vol. 9, No. 3, 48, 30.09.2022.

Research output: Contribution to Journal/MagazineJournal articlepeer-review

Harvard

Balázs, M, Fretwell, D & Jay, J 2022, 'Interacting particle systems and Jacobi style identities', Research in the Mathematical Sciences, vol. 9, no. 3, 48. https://doi.org/10.1007/s40687-022-00342-2

APA

Balázs, M., Fretwell, D., & Jay, J. (2022). Interacting particle systems and Jacobi style identities. Research in the Mathematical Sciences, 9(3), Article 48. https://doi.org/10.1007/s40687-022-00342-2

Vancouver

Balázs M, Fretwell D, Jay J. Interacting particle systems and Jacobi style identities. Research in the Mathematical Sciences. 2022 Sept 30;9(3):48. Epub 2022 Jul 21. doi: 10.1007/s40687-022-00342-2

Author

Balázs, Márton ; Fretwell, Dan ; Jay, Jessica. / Interacting particle systems and Jacobi style identities. In: Research in the Mathematical Sciences. 2022 ; Vol. 9, No. 3.

Bibtex

@article{3d57f87ed76c46ba887c2e0dace241b8,
title = "Interacting particle systems and Jacobi style identities",
abstract = "We consider the family of nearest neighbour interacting particle systems on Z allowing 0, 1 or 2 particles at a site. We parametrise a wide subfamily of processes exhibiting product blocking measure and show how this family can be “stood up” in the sense of Bal{\'a}zs and Bowen (Ann Inst H Poincar{\'e} Probab Stat 54(1):514–528, 2018). By comparing measures, we prove new three variable Jacobi style identities, related to counting certain generalised Frobenius partitions with a 2-repetition condition. By specialising to specific processes, we produce two variable identities that are shown to relate to Jacobi triple product and various other identities of combinatorial significance. The family of k-exclusion processes for arbitrary k are also considered and are shown to give similar Jacobi style identities relating to counting generalised Frobenius partitions with a k-repetition condition.",
author = "M{\'a}rton Bal{\'a}zs and Dan Fretwell and Jessica Jay",
year = "2022",
month = sep,
day = "30",
doi = "10.1007/s40687-022-00342-2",
language = "English",
volume = "9",
journal = "Research in the Mathematical Sciences",
number = "3",

}

RIS

TY - JOUR

T1 - Interacting particle systems and Jacobi style identities

AU - Balázs, Márton

AU - Fretwell, Dan

AU - Jay, Jessica

PY - 2022/9/30

Y1 - 2022/9/30

N2 - We consider the family of nearest neighbour interacting particle systems on Z allowing 0, 1 or 2 particles at a site. We parametrise a wide subfamily of processes exhibiting product blocking measure and show how this family can be “stood up” in the sense of Balázs and Bowen (Ann Inst H Poincaré Probab Stat 54(1):514–528, 2018). By comparing measures, we prove new three variable Jacobi style identities, related to counting certain generalised Frobenius partitions with a 2-repetition condition. By specialising to specific processes, we produce two variable identities that are shown to relate to Jacobi triple product and various other identities of combinatorial significance. The family of k-exclusion processes for arbitrary k are also considered and are shown to give similar Jacobi style identities relating to counting generalised Frobenius partitions with a k-repetition condition.

AB - We consider the family of nearest neighbour interacting particle systems on Z allowing 0, 1 or 2 particles at a site. We parametrise a wide subfamily of processes exhibiting product blocking measure and show how this family can be “stood up” in the sense of Balázs and Bowen (Ann Inst H Poincaré Probab Stat 54(1):514–528, 2018). By comparing measures, we prove new three variable Jacobi style identities, related to counting certain generalised Frobenius partitions with a 2-repetition condition. By specialising to specific processes, we produce two variable identities that are shown to relate to Jacobi triple product and various other identities of combinatorial significance. The family of k-exclusion processes for arbitrary k are also considered and are shown to give similar Jacobi style identities relating to counting generalised Frobenius partitions with a k-repetition condition.

U2 - 10.1007/s40687-022-00342-2

DO - 10.1007/s40687-022-00342-2

M3 - Journal article

VL - 9

JO - Research in the Mathematical Sciences

JF - Research in the Mathematical Sciences

IS - 3

M1 - 48

ER -